Congruence topologies on the mapping class group

Abstract

Let (S) be the pure mapping class group of a connected orientable surface S of negative Euler characteristic. For C a class of finite groups, let π1(S) C be the pro- C completion of the fundamental group of S. The C-congruence completion (S) C of (S) is the profinite completion induced by the embedding (S)Out(π1(S) C). In this paper, we begin a systematic study of such completions for different C. We show that the combinatorial structure of the profinite groups (S) C closely resemble that of (S). A fundamental question is how C-congruence completions compare with pro- C completions. Even though, in general (e.g.\ for C the class of finite solvable groups), (S) C is not even virtually a pro- C group, we show that, for Z/2∈ C, g(S)≤ 2 and S open, there is a natural epimorphism from the C-congruence completion (S)(2) C of the abelian level of order 2 to its pro- C completion (S)(2) C. In particular, this is an isomorphism for the class of finite groups and for the class of 2-groups. Moreover, in these two cases, the result also holds for a closed surface.